Transcendental Bernstein series for solving reaction–diffusion equations with nonlocal boundary conditions through the optimization technique

Avazzadeh, Z.; Hassani, Hossein

doi:10.1002/num.22411

Cited by 9 publications

(4 citation statements)

References 22 publications

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“…where and to evaluate unknown matrix F, we apply the following formula: where Proof Due to the results in [34] and the concept of best approximation for function, the desired result obtained.…”

Section: Function Approximationmentioning

confidence: 99%

Modified wavelet method for solving multitype variable-order fractional partial differential equations generated from the modeling of phenomena

2021

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The aim of this paper is to introduce a new wavelet method for presenting approximate solutions of multitype variable-order (VO) fractional partial differential equations arising from the modeling of phenomena. In specific, this paper focuses on the numerical solution of the VO-fractional mobile-immobile advection-dispersion equation, Klein Gordon equation and Burgers equation. These equations are converted into a system of algebraic equations with the assistance of the bivariate Genocchi wavelet functions, their operational matrices, and the variable-order fractional Caputo derivative operator. Also, we present a new technique to get the operational matrix of integration and VO-fractional derivative. The modified operational matrices for solving the proposed equations are powerful and effective. So that, the accuracy of these matrices directly affects the implementation process. Finally, we consider numerical examples to confirm the superiority of the scheme, and for each example, exhibit the results through graphs and tables.

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Section: Function Approximationmentioning

confidence: 99%

Modified wavelet method for solving multitype variable-order fractional partial differential equations generated from the modeling of phenomena

2021

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“…Motivated by this fact, we mainly aim in this paper to provide a suitable approach to solve the one-dimensional parabolic equation (1.1) subject to non-local boundary conditions (1.2) by a spectral method with efficient implementation and exponential rate of convergence as in the spectral methods for problems with classical boundary conditions. We emphasize the fact that the parabolic equation with boundary conditions (1.2) considered in this work is not only interesting in its theoretical and practical applications, but also in the methodology proposed to handle with this problem, which constitutes a flexible approach that can be extended for solving more general PDEs subject to NLBCs (see e.g., [2,11,26]).…”

Section: Introductionmentioning

confidence: 99%

Error Analysis of Legendre-Galerkin Spectral Method for a Parabolic Equation With Dirichlet-Type Non-Local Boundary Conditions

Chattouh

Saoudi

2021

Mathematical Modelling and Analysis

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An efficient Legendre-Galerkin spectral method and its error analysis for a one-dimensional parabolic equation with Dirichlet-type non-local boundary conditions are presented in this paper. The spatial discretization is based on Galerkin formulation and the Legendre orthogonal polynomials, while the time derivative is discretized by using the symmetric Euler finite difference schema. The stability and convergence of the semi-discrete spectral approximation are rigorously set up by following a novel approach to overcome difficulties caused by the non-locality of the boundary condition. Several numerical tests are included to confirm the efficacy of the proposed method and to support the theoretical results.

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“…Ganesan and Lingeshwaran (2017) proposed a finite-element scheme using the Galerkin finite-element method for computations of the cancer invasion model. Avazzadeh and Hassani (2019) applied transcendental Bernstein series as base functions to solve reaction-diffusion equations with nonlocal boundary conditions. Ravi Kanth and Garg (2020) presented a combination of the Crank-Nicolson and exponential B-spline methods for solving a class of time-fractional reaction-diffusion equation.…”

Section: Introductionmentioning

confidence: 99%

Solving nonlinear systems of fractional-order partial differential equations using an optimization technique based on generalized polynomials

et al. 2020

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This paper addresses the application of generalized polynomials for solving nonlinear systems of fractional-order partial differential equations with initial conditions. First, the solutions are expanded by means of generalized polynomials through an operational matrix. The unknown free coefficients and control parameters of the expansion with generalized polynomials are evaluated by means of an optimization process relating the nonlinear systems of fractionalorder partial differential equations with the initial conditions. Then, the Lagrange multipliers are adopted for converting the problem into a system of algebraic equations. The convergence of the proposed method is analyzed. Several prototype problems show the applicability of the algorithm. The approximations obtained by other techniques are also tested confirming the high accuracy and computational efficiency of the proposed approach.

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Transcendental Bernstein series for solving reaction–diffusion equations with nonlocal boundary conditions through the optimization technique

Cited by 9 publications

References 22 publications

Modified wavelet method for solving multitype variable-order fractional partial differential equations generated from the modeling of phenomena

Modified wavelet method for solving multitype variable-order fractional partial differential equations generated from the modeling of phenomena

Error Analysis of Legendre-Galerkin Spectral Method for a Parabolic Equation With Dirichlet-Type Non-Local Boundary Conditions

Solving nonlinear systems of fractional-order partial differential equations using an optimization technique based on generalized polynomials

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